Riemannian Hamiltonian Monte Carlo (RHMC) is a promising MCMC methodology thanks to its ability to accommodate position-dependent preconditioning and multi-step proposals. While RHMC performs well in low dimensions, it becomes infeasible in high dimensions due to its $O(d^3)$ cost per fixed-point iteration, where $d$ is the dimension of the target density. Even when the position-dependent preconditioner is based on the diagonal of the Hessian, the cost is still $O(d^2)$ per fixed-point iteration. In this paper, we propose a computational method to reduce the computational complexity of RHMC fixed-point iterations with diagonal preconditioners from $O(d^2)$ to $O(d)$ for targets with ``coordinate friendly'' structures. This distribution class includes generalized linear models as well as other dense and sparse graphical models. The method is expressed as manipulating the compute graph and can therefore be automated to work on black box targets. Finally, we show empirically that our implementation of RHMC results in better sample quality per unit of compute time for various target distributions compared to state-of-the-art HMC NUTS algorithms with both position-independent and position-dependent preconditioners.
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